Multiresolution properties of the wavelet Galerkin operator

Abstract

This paper extends recent results by the author [J. Math. Phys. 3 1, 1898 (1990), J. Math. Phys. 3 2, 57 (1991)] that show a scaling parameter sequence h yields an orthonormal wavelet basis for L²(R) if and only if an associated operator S_h has eigenvalue 1 with multiplicity 1. The operator transforms a sequence a by S_h(a)(k)=2Σ_m,n∼(h(m))h(n)a(2k+m−n). A correspondence is derived between S_h and Galerkin projection operators related to the multiresolution analysis defined by the orthonormal wavelet basis. The spectrum of S_h is characterized in terms of the Fourier modulus of the (unique) scaling function φ that satisfies φ(x)=2Σ_nh(n)φ(2x−n). This characterization yields several results including a direct, alternate proof that the eigenvalue 1 of S_h has multiplicity 1.